2-subnormal not implies hypernormalized: Difference between revisions
(New page: {{subgroup property non-implication| stronger = 2-subnormal subgroup| weaker = hypernormalized}} ==Statement== ===Verbal statement=== A 2-subnormal subgroup of a group need not be [...) |
No edit summary |
||
| Line 1: | Line 1: | ||
{{subgroup property non-implication| | {{subgroup property non-implication| | ||
stronger = 2-subnormal subgroup| | stronger = 2-subnormal subgroup| | ||
weaker = hypernormalized}} | weaker = hypernormalized subgroup}} | ||
==Statement== | ==Statement== | ||
Revision as of 21:08, 20 August 2008
This article gives the statement and possibly, proof, of a non-implication relation between two subgroup properties. That is, it states that every subgroup satisfying the first subgroup property (i.e., 2-subnormal subgroup) need not satisfy the second subgroup property (i.e., hypernormalized subgroup)
View a complete list of subgroup property non-implications | View a complete list of subgroup property implications
Get more facts about 2-subnormal subgroup|Get more facts about hypernormalized subgroup
EXPLORE EXAMPLES YOURSELF: View examples of subgroups satisfying property 2-subnormal subgroup but not hypernormalized subgroup|View examples of subgroups satisfying property 2-subnormal subgroup and hypernormalized subgroup
Statement
Verbal statement
A 2-subnormal subgroup of a group need not be hypernormalized.
Proof
An example in the symmetric group on four letters
Let be the symmetric group on four letters and be the two-element subgroup generated by .
Then, is normal in the subgroup , which is normal in . So is 2-subnormal in .
On the other hand, the normalizer is a dihedral subgroup of order eight, which is a self-normalizing subgroup.